Antonio Rojas-León
Published 2022-07-25Version 1
We prove a general independent equidistribution result for Gauss sums associated to $n$ monomials in $r$ variable multiplicative characters over a finite field, which generalizes several previous equidistribution results for Gauss and Jacobi sums. As an application, we show that any relation satisfied by these Gauss sums must be a combination of the conjugation relation $G(\chi)G(\overline\chi)=\pm q$, Galois conjugation invariance and the Hasse-Davenport product formula.
A note on the sign (unit root) ambiguities of Gauss sums in index 2 and 4 cases
On Gauss sums and the evaluation of Stechkin's constant
Complete Solving for Explicit Evaluation of Gauss Sums in the Index 2 Case
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